In this lecture we are going to discuss one more important group which is Quaternion group in group theory. First we define quaternion group and then one by one we will discover all the properties of that group. After that we will construct a composition table and with the help of that table we will also prove that Quaternion is a group.
Order of an element is equal to the order of its inverse theorem link is given below:
• Group Theory| Lecture ...
Fourth root of unity is an abelian group link is given below:
• Group Theory| Lecture ...
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Негізгі бет Quaternion group| Group Theory| Lecture 60| Theta Classes
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